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August 2nd, 2013, 08:31 AM
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syllabus of nit delhi of EEE stream
plz anyone give me the syllabus of NIT delhi IN EEE stream... Hello friend as you want the syllabus of NIT Delhi of EEE stream so here I am providing you the same….. Year I - Semester-1 MA 101 Mathematics –I HS 101 English for Communication (or) ME 102 Engineering Graphics PH 101 Physics (or ) CY 101 Chemistry EC 101 Basic Electronics Engineering (or ) EE 101 Basic Electrical Engineering CE 102 Environmental Science and Engineering ME101 Basic Mechanical Engineering CS 101 Problem Solving & Computer Programming(PSCP) (or) CE101 Engineering Mechanics PH 102 Physics Laboratory (or) CY102 Chemistry laboratory CS 102 PSCP Lab (or) ME 103 Workshop practice EA 101 Extra Academic Activity II - Semester MA 151 Mathematics –II ME 102 Engineering Graphics/ (or) HS101 English for communication CY 101 Chemistry (or) PH101 Physics EE 101 Basic Electrical Engineering (or) EC101 Basic Electronics Engineering ME 101 Basic Mechanical Engineering (or) CE102 Environmental Science and Engineering CE 101 Engineering Mechanics CS101 Problem solving & Computer programming(PSCP) CY 102 Chemistry Laboratory/ PH102 Physics laboratory ME 103 Workshop Practice/ CS102 PSCP Lab EA 151 Extra Academic Activity MATHEMATICS – I Detailed Syllabus: Matrix Theory: Elementary row and column operations on a matrix, Rank of matrix – Normal form – Inverse of a matrix using elementary operations –Consistency and solutions of systems of linear equations using elementary operations, linear dependence and independence of vectors - Characteristic roots and vectors of a matrix - Caley-Hamillton theorem and its applications, Complex matrices, Hermitian and Unitary Matrices - Reduction to diagonal form - Reduction of a quadratic form to canonical form – orthogonal transformation and congruent transformation. Differential Calculus: Rolle’s theorem; Mean value theorem; Taylor’s and Maclaurin’s theorems with remainders, Expansions; Indeterminate forms; Asymptotes and curvature; Curve tracing; Functions of several variables, Partial Differentiation, Total Differentiation, Euler’s theorem and generalization, maxima and minima of functions of several variables (two and three variables) – Lagrange’s method of Multipliers; Change of variables – Jacobians. Ordinary differential equations of first order: Formation of differential equations; Separable equations; equations reducible to separable form; exact equations; integrating factors; linear first order equations; Bernoulli’s equation; Orthogonal trajectories and Newton’s law of cooling. Ordinary linear differential equations of higher order : Homogeneous linear equations of arbitrary order with constant coefficients - Non-homogeneous linear equations with constant coefficients; Euler and Cauchy’s equations; Method of variation of parameters; System of linear differential equations, Vibrations of a beam. Reading: 1. R.K.Jain and S.R.K.Iyengar, Advanced Engineering Mathematics, Narosa Pub. House, 2008. 2. Erwyn Kreyszig, Advanced Engineering Mathematics, John Wiley and Sons, 8th Edition, 2008. 3. B.S.Grewal, Higher Engineering Mathematics, Khanna Publications, 2009. Rest of the syllabus here I am uploading pdf file which is free for download…. Last edited by Neelurk; March 5th, 2020 at 11:49 AM. |
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